Restricted Chebyshev centers in $L_1$-predual spaces

TL;DR

This paper characterizes the existence of restricted Chebyshev centers in $L_1$-predual spaces and provides a geometric characterization of these spaces using Chebyshev radii and centers.

Contribution

It offers a necessary and sufficient condition for restricted Chebyshev centers and characterizes $L_1$-predual spaces via Chebyshev radii and centers.

Findings

Provides a geometric characterization of $L_1$-predual spaces.

Explicitly describes Chebyshev centers in certain function spaces.

Establishes conditions for the existence of restricted Chebyshev centers.

Abstract

In this paper, we provide a necessary and sufficient condition for the existence of a restricted Chebyshev center of a compact subset of an $L_{1}$-predual space in a closed convex subset of the $L_{1}$-predual space. We also provide a geometrical characterization of an $L_{1}$-predual space in terms of the restricted Chebyshev radius in the following manner. A real Banach space $X$ is an $L_{1}$-predual space if and only if for each non-empty finite subset $F$ of $X$ and closed convex subset $V$ of $X$, $rad_{V}(F) = rad_{X}(F) + d(V, cent_{X}(F))$, where we denote $rad_{X}(F)$, $rad_{V}(F)$, $cent_{X}(F)$ and $d(V, cent_{X}(F))$ to be the Chebyshev radius of $F$ in $X$, the restricted Chebyshev radius of $F$ in $V$, the set of Chebyshev centers of $F$ in $X$ and the distance between the sets $V$ and $cent_{X}(F)$ respectively. Furthermore, we explicitly describe the Chebyshev centers of closed bounded subsets of an $M$-summand in the space of real-valued continuous functions on a compact Hausdorff space.